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Communications in Statistics - Theory and Methods Volume 50, 2021 - Issue 11
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Original Articles

Statistical inferences for varying coefficient partially non linear model with missing covariates

Xiuli WangSchool of Mathematics and Statistics, Shandong Normal University, Jinan, Shandong, People’s Republic of China; Correspondence[email protected] [email protected]
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,
Peixin ZhaoCollege of Mathematics and Statistics, Chongqing Technology and Business University, Chongqing, People’s Republic of ChinaView further author information
&
Haiyan DuSchool of Mathematics and Statistics, Shandong Normal University, Jinan, Shandong, People’s Republic of China; View further author information
Pages 2599-2618 | Received 21 Dec 2018, Accepted 27 Sep 2019, Published online: 11 Oct 2019

References

  • Chen, P. P., S. Y. Feng, and L. G. Xue. 2015. Statistical inference for semiparametric varying coefficient partially linear model with missing data (in Chinese). Acta Mathematica Scientia 35A (2):345–58.
  • Chen, X. R., A. T. Wan, and Y. Zhou. 2015. Efficient quantile regression analysis with missing observations. Journal of the American Statistical Association 110 (510):723–41. doi:10.1080/01621459.2014.928219.
  • Horvitz, D. G., and D. J. Thompson. 1952. A Generalization of Sampling Without Replacement From a Finite Universe. Journal of the American Statistical Association 47 (260):663–85. doi:10.1080/01621459.1952.10483446.
  • Huang, Z. S., and R. Q. Zhang. 2009. Empirical likelihood for nonparametric parts in semiparametric varying coefficient partially linea rmodels. Statistics and Probability Letters 79 (16):1798–808. doi:10.1016/j.spl.2009.05.008.
  • Li, G. R., and L. G. Xue. 2008. Empirical likelihood confidence region for the parameter in a partially linear errors-in-variables model. Communications in Statistics - Theory and Methods 37 (10):1552–64. doi:10.1080/03610920801893913.
  • Li, T. Z., and C.L. Mei. 2013. Estimation and inference for varyig coefficient partially nonlinear models. Journal of Statistical Planning and Inference 143 (11):2023–37. doi:10.1016/j.jspi.2013.05.011.
  • Liang, H., S. Wang, J. M. Robins, and R. J. Carroll. 2004. Estimation in partially linear models with missing covariates. Journal of the American Statistical Association 99 (466):357–67. doi:10.1198/016214504000000421.
  • Little, R. J. A., and D. B. Rubin. 2002. Statistical analysis with missing data. 2nd ed. New York, NY: Wiley.
  • Mack, Y. P., and B. W. Silverman. 1982. Weak and stronguniform consistency of kernel regression estimates. Zeitschrift for Wahrscheinlichkeitstheorie Und Verwandte Gebiete 61:405–15. doi:10.1007/BF00539840.
  • Niu, C. Z., X. Guo, W. L. Xu, and L. X. Zhu. 2014. Empirical likelihood inference in linear regression with nonignorable missing response. Computational Statistics and Data Analysis 79 (4):91–112. doi:10.1016/j.csda.2014.05.005.
  • Owen, A. 1988. Empirical likelihood ratio confidence intervals for a single functional. Biometrika 75 (2):237–49. doi:10.1093/biomet/75.2.237.
  • Owen, A. 1990. Empirical likelihood ratio confidence regions. The Annals of Statistics 18 (1):90–120. doi:10.1214/aos/1176347494.
  • Owen, A. 1991. Empirical likelihood for linear models. The Annals of Statistics 19 (4):1725–47. doi:10.1214/aos/1176348368.
  • Qian, Y. Y., and Z. S. Huang. 2016. Statistical inference for a varying-coefficient partially nonlinear model with measurement errors. Statistical Methodology 32:122–30. doi:10.1016/j.stamet.2016.05.004.
  • Qin, J., and J. Lawless. 1994. Empirical likelihood and general estimating equations. The Annals of Statistics 22 (1):300–25. doi:10.1214/aos/1176325370.
  • Robins, J. M., A. Rotnitzky, and L. P. Zhao. 1994. Estimation of regression coefficients when some regressors are not always observed. Journal of the American Statistical Association 89 (427):846–66. doi:10.1080/01621459.1994.10476818.
  • Robins, J. M., A. Rotnitzky, and L. P. Zhao. 1995. Analysis of semiparametric regression models for repeated outcomes in the presence of missing data. Journal of the American Statistical Association 90 (429):106–21. doi:10.1080/01621459.1995.10476493.
  • Shen, Y., and H. Y. Liang. 2016. Quantile regression and its empirical likelihood with missing response at random. Statistical Papers 510:1–23. doi:10.1007/s00362-016-0784-5.
  • Sherwood, B., L. Wang, and X. H. Zhou. 2013. Weighted quantile regression for analyzing health care cost data with missing covariates. Statistics in Medicine 32 (28):4967–79. doi:10.1002/sim.5883.
  • Tang, N., P. Zhao, and H. Zhu. 2014. Empirical likelihood for estimating equations with nonignorably missing data. Statistica Sinica 24 (2):723–47. doi:10.5705/ss.2012.254.
  • Wang, C. Y., S. Wang, R. G. Gutierrez, and R. J. Carroll. 1998. Local linear regression for generalized linear models with missing data. The Annals of Statistics 26:1028–50. doi:10.1214/aos/1024691087.
  • Wang, C. Y., S. Wang, L. P. Zhao, and S. T. Ou. 1997. Weighted semiparametric estimation in regression analysis with missing covariate data. Journal of the American Statistical Association 92 (438):512–25. doi:10.1080/01621459.1997.10474004.
  • Wang, Q. H., and J. N. K. Rao. 2002. Empirical likelihood-based inference under imputation for missing response data. The Annals of Statistics 30:896–924. doi:10.1214/aos/1028674845.
  • Wang, X. L., F. Chen, and L. Lin. 2013. Empirical Likelihood inference for estimating equation with missing data. Science China Mathematics 56 (6):1233–45. doi:10.1007/s11425-012-4504-x.
  • Wei, Y., Y. Y. Ma, and R. J. Carroll. 2012. Multiple imputation in quantile regression. Biometrika 99 (2):423–38. doi:10.1093/biomet/ass007.
  • Xiao, Y. T., and Z. S. Chen. 2018. Bias-corrected estimations in varying-coefficient partially nonlinear models with measurement error in the nonparametric part. Journal of Applied Statistics 45 (4):586–603. doi:10.1080/02664763.2017.1288201.
  • Xue, L. G., and L. X. Zhu. 2006. Empirical likelihood for single-index model. Journal of Multivariate Analysis 97 (6):1295–312. doi:10.1016/j.jmva.2005.09.004.
  • Xue, L. G., and L. X. Zhu. 2007. Empirical likelihood for a varying coefficient model with longitudinal data. Journal of the American Statistical Association 102 (478):642–54. doi:10.1198/016214507000000293.
  • Yang, H., and H. L. Liu. 2016. Penalized weighted composite quantile estimators with missing covariates. Statistical Papers 57 (1):69–88. doi:10.1007/s00362-014-0642-2.
  • Yang, J., and H. Yang. 2016. Smooth-threshold estimating equations for varying coefficient partially nonlinear models based on orthogonality-projection method. Journal of Computational and Applied Mathematics 302:24–37. doi:10.1016/j.cam.2016.01.038.
  • Yang, J., F. Lu, and X. W. Lu. 2020. Robust check loss-based inference of semiparametric models and its application in environmental data. Journal of Computational and Applied Mathematics 365. doi:10.1016/j.cam.2019.05.015.
  • Yang, J., F. Lu, G. Tian, X. Lu, and H. Yang. 2019. Robust variable selection of varying coefficient partially nonlinear model based on quantile regression. Statistics and Its Interface 12 (3):397–413. doi:10.4310/SII.2019.v12.n3.a5.
  • Yang, J., F. Lu, and H. Yang. 2018. Quantile regression for robust inference on varying coefficient partially nonlinear models. Journal of the Korean Statistical Society 47 (2):172–84. doi:10.1016/j.jkss.2017.12.002.
  • Zhao, P. Y., N. S. Tang, and D. P. Jiang. 2017. Efficient inverse probability weighting method for quantile regression with nonignorable missing data. Statistics 51 (2):363–86. doi:10.1080/02331888.2016.1268615.
  • Zhao, P. X., and L. G. Xue. 2009. Empirical likelihood inferences for semiparametric varying-coefficient partially linear errors-in-variables models with longitudinal data. Journal of Nonparametric Statistics 21 (7):907–23. doi:10.1080/10485250902980576.
  • Zhao, P. X., and L. G. Xue. 2013. Empirical likelihood for nonparametric components in additive partially linear models. Communications in Statistics – Simulation and Computation 42 (9):1935–47. doi:10.1080/03610918.2012.683925.
  • Zhou, X. S., P. X. Zhao, and X. L. Wang. 2017. Empirical likelihood inferences for varying coefficient partially nonlinear models. Journal of Applied Statistics 44 (3):474–92. doi:10.1080/02664763.2016.1177496.
  • Zhu, L. X., and L. G. Xue. 2006. Empirical likelihood confidence region for partially linear single-index model. Journal of the Royal Statistical Society: Series B (Statistical Methodology) 86:549–70. doi:10.1111/j.1467-9868.2006.00556.x.

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